Method of storing data on a photograph

ABSTRACT

A method of storing data on a photograph includes delimiting a plurality of data block regions on the photograph, the plurality of data block regions superposing a region of the photograph delimited for the printing of a photographic image; compressing data representing the image contained in the photograph with a compression technique; redundantly encoding the compressed data using Reed-Solomon encoding techniques; shuffling the redundantly encoded compressed data in a deterministic manner to reduce potential effects of localized encoded data caused by damage to the photograph; and printing the shuffled data as dots within the data block regions on the photograph. Each of the plurality of data blocks is printed on a first side with a first column of orientation dots, and on a second side with a second column of orientation dots.

This is a Continuation of U.S. application Ser. No. 13,108,981 filed May 16, 2011, which is a Continuation of U.S. application Ser. No. 12,966,838 filed Dec. 13, 2010, now issued U.S. Pat. No. 7,967,406, which is a Continuation of Ser. No. 12,031,526 filed on Feb. 14, 2008, now issued U.S. Pat. No. 7,857,405, which is a Continuation of Ser. No. 11/006,577 filed on Dec. 8, 2004, now issued U.S. Pat. No. 7,354,122, which is a Continuation of Ser. No. 09/693,083 filed on Oct. 20, 2000 issued as U.S. Pat. No. 6,859,225, which is herein incorporated by reference.

TECHNICAL FIELD

The present invention relates to a data processing method and apparatus and, in particular, discloses a data encoding method and apparatus for storing data on photographs using an ink jet printing system using an infra-red ink wherein the data is original image data taken from a camera system which has been transformed by an image processing program, the data also including a copy of the program.

CO-PENDING APPLICATIONS

Various methods, systems and apparatus relating to the present invention are disclosed in the following co-pending applications filed by the applicant or assignee of the present invention with the present application:

6,496,654 6,924,835 6,647,369 6,943,830 7,535,582

The disclosures of these co-pending applications are incorporated herein by reference.

Various methods, systems and apparatus relating to the present invention are disclosed in the following co-pending application filed by the applicant or assignee of the present invention on Jul. 10, 1998:

6,476,863 6,459,495

The disclosures of this co-pending application are incorporated herein by reference.

Various methods, systems and apparatus relating to the present invention are disclosed in the following co-pending applications filed by the applicant or assignee of the present invention on Jun. 30, 2000:

6,471,331 6,676,250 6,347,864 6,439,704 6,425,700 6,588,952

The disclosures of this co-pending application are incorporated herein by reference.

BACKGROUND

As the applicant has previously noted in pending applications U.S. Ser. No. 09/113,070 and U.S. Ser. No. 09/112,785 there is a general need for a print media scanning system that allows for high volumes of computer data to be stored on a simple print media, such as a card while simultaneously tolerating a high degree of corruption when read by a scanning device. For example, the form of distribution can suffer a number of data corruption errors when the surface is scanned by a scanning device. The errors can include:

-   1. Dead pixel errors which are a result of reading the surface of     the card with a linear CCD having a faulty pixel reader for a line     thereby producing the same value for all points on the line. -   2. Preferably, the system adopted can tolerate errors wherein text     is written by the owner of the card on the surface. Such errors are     ideally tolerated by any scanning system scanning the card. -   3. Various data errors on the surface of the card may arise and any     scuffs or blotches should be tolerated by any system determining the     information stored on the surface of the card. -   4. A certain degree of “play” exists in the insertion of the card     into a card reader. This play can comprise a degree of rotation of     the card when read by a card reader. -   5. Further, the card reader is assumed to be driven past a linear     image sensor such as a CCD by means of an electric motor. The     electric motor may experience a degree of fluctuation which will     result in fluctuations in the rate of transmission of the data     across the surface of the CCD. These motor fluctuation errors should     also be tolerated by the data encoding method on the surface of the     card. -   6. The scanner of the surface of the card may experience various     device fluctuations such that the intensity of individual pixels may     vary. Reader intensity variations should also be accounted for in     any system or method implemented in the data contained on the     surface of the card.

Ideally, any scanning system should be able to maintain its accuracy in the presence of errors due to the above factors.

In applications U.S. Ser. No. 09/113,070 and U.S. Ser. No. 09/112,785, the applicant disclosed a method and apparatus for printing data in an encoded fault tolerant form on the back of a photograph preferably using black ink on a white background. The data represented the photograph in a digital image file format and/or data comprising a computer programme script which could be run to recreate the image or to apply some effect to the image. A programming language called a VARK script was invented for this purpose which was designed to be portable and device independent.

SUMMARY

According to an aspect of the present disclosure, a method of storing data on a photograph comprises the steps of delimiting a plurality of data block regions on the photograph, the plurality of data block regions superposing a region of the photograph delimited for the printing of a photographic image; compressing data representing the image contained in the photograph with a compression technique; redundantly encoding the compressed data using Reed-Solomon encoding techniques; shuffling the redundantly encoded compressed data in a deterministic manner to reduce potential effects of localized encoded data caused by damage to the photograph; and printing the shuffled data as dots within the data block regions on the photograph. Each of the plurality of data blocks is printed on a first side with a first column of orientation dots, and on a second side with a second column of orientation dots.

BRIEF DESCRIPTION OF THE DRAWINGS

Notwithstanding any other forms which may fall within the scope of the present invention, preferred forms of the invention will now be described, by way of example only, with reference to the accompanying drawings in which:

FIG. 1 illustrates the data surface of a card or photograph;

FIG. 2 illustrates schematically the layout of a single data block;

FIG. 3 illustrates a single data block;

FIG. 4 and FIG. 5 illustrate magnified views of portions of the data block of FIG. 3;

FIG. 6 illustrates a single target structure;

FIG. 7 illustrates the target structure of a data block;

FIG. 8 illustrates the positional relationship of targets relative to border clocking regions of a data region;

FIG. 9 illustrates the orientation columns of a datablock;

FIG. 10 illustrates the array of dots of a datablock;

FIG. 11 illustrates schematically the structure of data for Reed-Solomon encoding;

FIG. 12 illustrates in hexadecimal notation the structure of control block data before Reed-Solomon encoding;

FIG. 13 illustrates the Reed-Solomon encoding process; and

FIG. 14 illustrates the layout of encoded data within a datablock.

DETAILED DESCRIPTION

The present invention preferably uses an ink jet printing system having at least four ink jet print nozzles per dot in a pagewidth printhead. The four inks would be cyan, magenta, and yellow for printing a color image and an infra-red (IR) ink for printing data in an encoded fault tolerant form along with the color image. One such ink jet printhead which can print using four inks is disclosed in the applicant's co-pending applications U.S. Ser. No. 09/608,779, U.S. Ser. No. 09/607,987, U.S. Ser. No. 09/608,776, U.S. Ser. No. 09/607,250, and U.S. Ser. No. 09/607,991.

Infra-red inks suitable for use with the current invention are disclosed in the applicant's co-pending applications, Australian provisional patent applications PQ9412 and PQ9376 both filed on Aug. 14, 2000 and applicant's applications PQ9509 filed on Aug. 18, 2000, and PQ9571, and PQ9561 filed on Aug. 21, 2000.

Techniques that can be used to encode the information for printing an infra-red ink are disclosed applicant's co-pending application U.S. Ser. No. 09/113,070 and U.S. Ser. No. 09/112,785, the description of which is incorporated herein by reference. These techniques were described as Artcard, alternative Artcard or Dotcard formats. In these applications, the data was printed using a black ink on a white background on the back of a card of size 85 mm×55 mm in an active data area of 80 mm×50 mm. In this way 967 Kbytes of data was fault tolerantly encoded as 1.89 Mbytes of data using 15,876,000 printed dots.

Encoded Data Format

Of course, while other encoded data formats are possible, there will now be described one such encoded data format using the “alternative Artcard” format as above referred to) with a number of preferable features.

Encoded Data Overview

The Encoded data can be used to recover the image over which it is written or to provide a digital format thereof for manipulation in applications, for example transmission over a digital telecommunication network or image processing in a computer.

Encoded data technology can also be independent of the printing resolution. The notion of storing data as dots on print media simply means that if it is possible to put more dots in the same space (by increasing resolution), then those dots can represent more data. The preferred embodiment assumes utilization of 1600 dpi printing on a 102 mm×152 mm (4″×6″) size photograph as the sample photograph, but it is simple to determine alternative equivalent layouts and data sizes for other photograph sizes and/or other print resolutions. For example, in the applicant's ink jet printing camera system a panoramic print can also be produced which is twice the length of the standard size photograph allowing twice the data to be recorded enhancing redundancy of the image data. Regardless of the print resolution, the reading technique remains the same. After all decoding and other overhead has been taken into account, the encoded data format is capable of storing 3 to 4 Megabyte of data for a 4″×6″ print size at print resolutions up to 1600 dpi. More encoded data can be stored at print resolutions greater than 1600 dpi.

Format of Encoded Data

The structure of data on the photograph is therefore specifically designed to aid the recovery of data. This section describes the format of the data on a photograph. This format was previously described in U.S. Ser. No. 09/113,070 and U.S. Ser. No. 09/112,785.

Dots

The dots printed on the photograph are in infra-red ink with or over a color image. Consequently a “data dot” is physically different from a “non-data dot”. When the photograph is illuminated by an infra-red source having complementary spectral properties to the absorption characteristics of the IR ink the data appears as a monochrome display of “black” on “white” dots. The black dots correspond to dots were the IR ink is and has absorbed the IR illumination and “white” dots correspond to areas of the color image over which no IR ink has been printed and reflecting the IR illumination substantially unattenuated or only partially attenuated. Hereinafter the terms black and white as just defined will be used when referring to the IR ink dots recording data.

In describing this embodiment, the term dot refers to a physical printed dot (of IR ink) on a photograph. When an encoded data reader scans encoded data, the dots must be sampled at least double the printed resolution to satisfy Nyquist's Theorem. The term pixel refers to a sample value from an encoded data reader device. For example, when 1600 dpi dots are scanned at 4800 dpi there are 3 pixels in each dimension of a dot, or 9 pixels per dot. The sampling process will be further explained hereinafter.

Turning to FIG. 1, there is shown the data surface 101 illustrating a sample of encoded data. Each photograph having encoded data consists of an “active” region 102 surrounded by a border region 103. The border 103 contains no data information, but can be used by an encoded data reader to calibrate signal levels. The active region is an array of data blocks e.g. 104, with each data block separated from the next by a gap of 8 image dots e.g. 106. Depending on the print resolution, the number of data blocks on a photograph will vary. On a 1600 dpi printed photograph of 4″×6″, the array can be 15×14 data blocks in an area of approximately 97 mm.×147 mm. for 2.5 mm margins. Each data block 104 has dimensions of 627×394 dots with an inter-block gap 106 of 8 image dots.

Data Blocks

Turning now to FIG. 2, there is shown a single data block 107. The active region of encoded data consists of an array of identically structured data blocks 107. Each of the data blocks has the following structure: a data region 108 surrounded by clock-marks 109, borders 110, and targets 111. The data region holds the encoded data proper, while the clock-marks, borders and targets are present specifically to help locate the data region and ensure accurate recovery of data from within the region.

Each data block 107 has dimensions of 627×394 dots. Of this, the central area of 595×384 dots is the data region 108. The surrounding dots are used to hold the clock-marks, borders, and targets.

Borders and Clockmarks

FIG. 3 illustrates a data block with FIG. 4 and FIG. 5 illustrating magnified edge portions thereof. As illustrated in FIG. 4 and FIG. 5, there are two 5 dot high border and clockmark regions 170, 177 in each data block: one above and one below the data region. For example, the top 5 dot high region consists of an outer black dot border line 112 (which stretches the length of the data block), a white dot separator line 113 (to ensure the border line is independent), and a 3 dot high set of clock marks 114. The clock marks alternate between a white and black row, starting with a black clock mark at the 8th column from either end of the data block. There is no separation between clockmark dots and dots in the data region.

The clock marks are symmetric in that if the encoded data is inserted rotated 180 degrees, the same relative border/clockmark regions will be encountered. The border 112, 113 is intended for use by an encoded data reader to keep vertical tracking as data is read from the data region. The clockmarks 114 are intended to keep horizontal tracking as data is read from the data region. The separation between the border and clockmarks by a white line of dots is desirable as a result of blurring occurring during reading. The border thus becomes a black line with white on either side, making for a good frequency response on reading. The clockmarks alternating between white and black have a similar result, except in the horizontal rather than the vertical dimension. Any encoded data reader must locate the clockmarks and border if it intends to use them for tracking. The next section deals with targets, which are designed to point the way to the clockmarks, border and data.

Targets in the Target Region

As shown in FIG. 7, there are two 15-dot wide target regions 116, 117 in each data block: one to the left and one to the right of the data region. The target regions are separated from the data region by a single column of dots used for orientation. The purpose of the Target Regions 116, 117 is to point the way to the clockmarks, border and data regions. Each Target Region contains 6 targets e.g. 118 that are designed to be easy to find by an encoded data reader. Turning now to FIG. 6 there is shown the structure of a single target 120. Each target 120 is a 15×15 dot black square with a center structure 121 and a run-length encoded target number 122. The center structure 121 is a simple white cross, and the target number component 122 is simply two columns of white dots, each being 2 dots long for each part of the target number. Thus target number 1′s target id 122 is 2 dots long, target number 2′s target id 122 is 4 dots wide etc.

As shown in FIG. 7, the targets are arranged so that they are rotation invariant with regards to card insertion. This means that the left targets and right targets are the same, except rotated 180 degrees. In the left Target Region 116, the targets are arranged such that targets 1 to 6 are located top to bottom respectively. In the right Target Region, the targets are arranged so that target numbers 1 to 6 are located bottom to top. The target number id is always in the half closest to the data region. The magnified view portions of FIG. 7 reveals clearly the how the right targets are simply the same as the left targets, except rotated 180 degrees.

As shown in FIG. 8, the targets 124, 125 are specifically placed within the Target Region with centers 55 dots apart. In addition, there is a distance of 55 dots from the center of target 1 (124) to the first clockmark dot 126 in the upper clockmark region, and a distance of 55 dots from the center of the target to the first clockmark dot in the lower clockmark region (not shown). The first black clockmark in both regions begins directly in line with the target center (the 8th dot position is the center of the 15 dot-wide target).

The simplified schematic illustrations of FIG. 8 illustrates the distances between target centers as well as the distance from Target 1 (124) to the first dot of the first black clockmark (126) in the upper border/clockmark region. Since there is a distance of 55 dots to the clockmarks from both the upper and lower targets, and both sides of the encoded data are symmetrical (rotated through 180 degrees), the card can be read left-to-right or right-to-left. Regardless of reading direction, the orientation does need to be determined in order to extract the data from the data region.

Orientation Columns

As illustrated in FIG. 9, there are two 1 dot wide Orientation Columns 127, 128 in each data block: one directly to the left and one directly to the right of the data region. The Orientation Columns are present to give orientation information to an encoded data reader: On the left side of the data region (to the right of the Left Targets) is a single column of white dots 127. On the right side of the data region (to the left of the Right Targets) is a single column of black dots 128. Since the targets are rotation invariant, these two columns of dots allow an encoded data reader to determine the orientation of the photograph—has the photograph been inserted the right way, or back to front.

From the encoded data reader's point of view, assuming no degradation to the dots, there are two possibilities:

-   -   If the column of dots to the left of the data region is white,         and the column to the right of the data region is black, then         the reader will know that the photograph has been inserted the         same way as it was written.     -   If the column of dots to the left of the data region is black,         and the column to the right of the data region is white, then         the reader will know that the photograph has been inserted         backwards, and the data region is appropriately rotated. The         reader must take appropriate action to correctly recover the         information from the photograph.

Data Region

As shown in FIG. 10, the data region of a data block consists of 595 columns of 384 dots each, for a total of 228,480 dots. These dots must be interpreted and decoded to yield the original data. Each dot represents a single bit, so the 228,480 dots represent 228,480 bits, or 28,560 bytes. The interpretation of each dot can be as follows:

Black 1 White 0

The actual interpretation of the bits derived from the dots, however, requires understanding of the mapping from the original data to the dots in the data regions of the photograph.

Mapping Original Data to Data Region Dots

There will now be described the process of taking an original data file of maximum size 2,986,206 bytes and mapping it to the dots in the data regions of the 210 data blocks on a 1600 dpi photograph. An encoded data reader would reverse the process in order to extract the original data from the dots on a photograph. At first glance it seems trivial to map data onto dots: binary data is comprised of is and 0s, so it would be possible to simply write black and white dots onto the card. This scheme however, does not allow for the fact that ink can fade, parts of a card may be damaged with dirt, grime, or even scratches. Without error-detection encoding, there is no way to detect if the data retrieved from the card is correct. And without redundantly encoding, there is no way to correct the detected errors. The aim of the mapping process then, is to make the data recovery highly robust, and also give the encoded data reader the ability to know it read the data correctly.

There are four basic steps involved in mapping an original data file to data region dots:

-   -   Compress the original data     -   Redundantly encode the compressed data     -   Shuffle the encoded data in a deterministic way to reduce the         effect of localized encoded data damage     -   Write out the shuffled, encoded data as dots to the data blocks         on the photograph. Each of these steps is examined in detail in         the following sections.

Compress the Original Data

The data to be recorded on the photograph may comprise several blocks, e.g.

-   -   1) color image data     -   2) audio annotation data     -   3) image processing control script     -   4) position data (such as from a GPS receiver)     -   5) time and date     -   6) camera orientation     -   7) tracking data—such as ink cartridge information, software         versions, camera identification, and so forth.

For a high quality image, the source image data may be 2000×3000 pixels, with 3 bytes per pixel. This results in 18 Mbytes of data, which is more than can be stored in infra-red dots on the photo. The image data can be compressed by a factor of around 10:1 with generally negligible reduction in image quality using an image compression technique. Suitable image compression techniques include JPEG compression based on discrete cosine transforms and Huffman coding, wavelet compression as used in the JPEG2000 standard or fractal compression.

With 10:1 compression, the 18 Mbytes of a high quality image results in 1.8 Mbytes of compressed data.

The audio annotation data can also be compressed using, for example, MP3 compression.

The image processing control scrip will typically not consume more than 10 Kbytes of data, with the exception of images embedded in the script. These images should generally be compressed. A suitable image processing script language designed for photograph processing is the ‘Vark’ language developed by the present applicant and disclosed in U.S. Ser. No. 09/113,070 (Docket No. ART02US). The remaining data is small, and need not be compressed.

Redundantly Encode Using Reed-Solomon Encoding

The mapping of data to encoded data dots relies heavily on the method of redundancy encoding employed. Reed-Solomon encoding is preferably chosen for its ability to deal with burst errors and effectively detect and correct errors using a minimum of redundancy. Reed Solomon encoding is adequately discussed in the standard texts such as Wicker, S., and Bhargava, V., 1994, Reed-Solomon Codes and their Applications, IEEE Press, Rorabaugh, C, 1996; Error Coding Cookbook, McGraw-Hill, Lyppens, H., 1997; Reed-Solomon Error Correction, Dr. Dobb's Journal, January 1997 (Volume 22, Issue 1).

A variety of different parameters for Reed-Solomon encoding can be used, including different symbol sizes and different levels of redundancy. Preferably, the following encoding parameters are used:

-   -   m=8     -   t=64

Having m=8 means that the symbol size is 8 bits (1 byte). It also means that each Reed-Solomon encoded block size n is 255 bytes (2⁸-1 symbols). In order to allow correction of up to t symbols, 2t symbols in the final block size must be taken up with redundancy symbols. Having t=64 means that 64 bytes (symbols) can be corrected per block if they are in error. Each 255 byte block therefore has 128 (2×64) redundancy bytes, and the remaining 127 bytes (k=127) are used to hold original data. Thus:

-   -   n=255     -   k=127         The practical result is that 127 bytes of original data are         encoded to become a 255-byte block of Reed-Solomon encoded data.         The encoded 255-byte blocks are stored on the photograph and         later decoded back to the original 127 bytes again by the         encoded data reader. The 384 dots in a single column of a data         block's data region can hold 48 bytes (384/8). 595 of these         columns can hold 28,560 bytes. This amounts to 112 Reed-Solomon         blocks (each block having 255 bytes). The 210 data blocks of a         complete photograph can hold a total of 23,520 Reed-Solomon         blocks (5,997,600 bytes, at 255 bytes per Reed-Solomon block).         Two of the Reed-Solomon blocks are reserved for control         information, but the remaining blocks are used to store data.         Since each Reed-Solomon block holds 127 bytes of actual data,         the total amount of data that can be stored on an photograph is         2,986,786 bytes (23,518×127). If the original data is less than         this amount, the data can be encoded to fit an exact number of         Reed-Solomon blocks, and then the encoded blocks can be         replicated until all 23,518 blocks are used. FIG. 11 illustrates         the overall form of encoding utilized.

Each of the two Control blocks 132, 133 contain the same encoded information required for decoding the remaining 23,518 Reed-Solomon blocks:

-   -   The number of Reed-Solomon blocks in a full message (16 bits         stored lo/hi), and     -   The number of data bytes in the last Reed-Solomon block of the         message (8 bits).     -   These two numbers are repeated 32 times (consuming. 96 bytes)         with the remaining 31 bytes reserved and set to 0. Each control         block is then Reed-Solomon encoded, turning the 127 bytes of         control information into 255 bytes of Reed-Solomon encoded data.

The Control Block is stored twice to give greater chance of it surviving. In addition, the repetition of the data within the Control Block has particular significance when using Reed-Solomon encoding. In an uncorrupted Reed-Solomon encoded block, the first 127 bytes of data are exactly the original data, and can be looked at in an attempt to recover the original message if the Control Block fails decoding (more than 64 symbols are corrupted). Thus, if a Control Block fails decoding, it is possible to examine sets of 3 bytes in an effort to determine the most likely values for the 2 decoding parameters. It is not guaranteed to be recoverable, but it has a better chance through redundancy. Say the last 159 bytes of the Control Block are destroyed, and the first 96 bytes are perfectly ok. Looking at the first 96 bytes will show a repeating set of numbers. These numbers can be sensibly used to decode the remainder of the message in the remaining 23,518 Reed-Solomon blocks.

To store a 3-color image each color either “on” or “off” and size 4″×6″ (102 mm×152 mm) at 1600 dpi resolution requires 210,400 bits or 26,300 bytes of data. A program in Vark script may be approximately 10-15 Kbytes long. If we assume a program of size 13,568 bytes, this requires 39,868 Kbytes to be encoded to store the image data and the program data, according to the invention. The number of Reed-Solomon blocks required is 314. The first 313 Reed-Solomon blocks are completely utilized, consuming 39,751 bytes (313×127). The 314^(th) block has only 117 bytes of data (with the remaining 10 bytes all 0s).

A hex representation of the 127 bytes in each Control Block data before being Reed-Solomon encoded would be as illustrated in FIG. 12.

Scramble the Encoded Data

Assuming all the encoded blocks have been stored contiguously in memory, a maximum 5,997,600 bytes of data can be stored on the photograph (2 Control Blocks and 23,518 information blocks, totaling 23,520 Reed-Solomon encoded blocks). Preferably, the data is not directly stored onto the photograph at this stage however, or all 255 bytes of one Reed-Solomon block will be physically together on the card. Any dirt, grime, or stain that causes physical damage to the card has the potential of damaging more than 64 bytes in a single Reed-Solomon block, which would make that block unrecoverable. If there are no duplicates of that Reed-Solomon block, then the entire photograph cannot be decoded.

The solution is to take advantage of the fact that there are a large number of bytes on the photograph, and that the photograph has a reasonable physical size. The data can therefore be scrambled to ensure that symbols from a single Reed-Solomon block are not in close proximity to one another. Of course pathological cases of photograph degradation can cause Reed-Solomon blocks to be unrecoverable, but on average, the scrambling of data makes the data much more robust. The scrambling scheme chosen is simple and is illustrated schematically in FIG. 13. All the Byte 0 s from each Reed-Solomon block are placed together 136, then all the Byte 1 s etc. There will therefore be 23,520 byte 0′s, then 23,520 Byte 1′s etc. Each data block on the photograph can store 28,560 bytes. Consequently, there are approximately 4 bytes from each Reed-Solomon block in each of the data blocks on the photograph. Under this scrambling scheme, complete damage to 16 entire data blocks on the photograph will result in 64 symbol errors per Reed-Solomon block. This means that if there is no other damage to the photograph, the entire data is completely recoverable, even if there is no data duplication.

Write the Scrambled Encoded Data to the Photograph

Once the original data has been Reed-Solomon encoded, duplicated, and scrambled, there are 5,997,600 bytes of data to be stored on the photograph. Each of the data blocks on the photograph stores 28,560 bytes.

The data is simply written out to the photograph data blocks so that the first data block contains the first 28,560 bytes of the scrambled data, the second data block contains the next 28,560 bytes etc.

As illustrated in FIG. 14, within a data block, the data is written out column-wise left to right. Thus the left-most column within a data block contains the first 48 bytes of the 28,560 bytes of scrambled data, and the last column contains the last 48 bytes of the 28,560 bytes of scrambled data. Within a column, bytes are written out top to bottom, one bit at a time, starting from bit 7 and finishing with bit 0. If the bit is set (1), a black dot (IR ink dot) is placed on the photograph, if the bit is clear (0), no dot is placed on the photograph.

For example, a set of 5,997,600 bytes of data can be created by scrambling 23,520 Reed-Solomon encoded blocks to be stored onto an photograph. The first 28,560 bytes of data are written to the first data block. The first 48 bytes of the first 28,560 bytes are written to the first column of the data block, the next 48 bytes to the next column and so on. Suppose the first two bytes of the 28,560 bytes are hex D3 5F. Those first two bytes will be stored in column 0 of the data block. Bit 7 of byte 0 will be stored first, then bit 6 and so on. Then Bit 7 of byte 1 will be stored through to bit 0 of byte 1. Since each “1” is stored as a black dot, and each “0” as a white dot, these two bytes will be represented on the photograph as the following set of dots:

-   -   D3 (1101 0011) becomes: black, black, white, black, white,         white, black, black     -   5F (0101 1111) becomes: white, black, white, black, black,         black, black, black

The encoded image data is sent to an ink jet printer to drive the infra-red ink jet nozzles while the image data is used to drive the cyan, magenta, and yellow color nozzles while the print media is driven through the printhead of the printer as disclosed in applicant's co-pending applications U.S. Ser. No. 09/113,070 (Docket No. ART02US) and U.S. Ser. No. 09/112,785 (Docket No. ART29).

The image taken by the camera system is now available as a photographic image with the data necessary to reproduce that image printed therewith. It is not necessary to separately locate the negative if another copy of the photograph is desired, the image can be reproduced notwithstanding damage thereto and the image is available in a digital format which can be scanned into a computer system as disclosed in applicant's co-pending applications U.S. Ser. No. 09/113,070 (Docket No. ART02US) and U.S. Ser. No. 09/112,785 (Docket No. ART29) for whatever purpose or transmitted over a telecommunications network.

Another type of format the so-called Artcard format is disclosed in U.S. Ser. No. 09/113,070 (Docket No. ART02US) and U.S. Ser. No. 09/112,785 (Docket No. ART29US) and may equally be used here in place of the “alternative Artcard” format as described above. In the Artcard format a continuous area of data is printed on the print media, in the present case, in infra-red ink on the photograph surrounded by margins printed as targets at the leading and trailing edges of the data area and as other indicia to specify borders and clockmarks along the top and bottom thereof to aid decoding of the data contained in the data area. The targets are used to confirm that the orientation of the card when read is not rotated more than 1° from the horizontal and to detect whether the card has been inserted front or back first. Otherwise the reading of the data would be unreliable.

The foregoing description has been limited to specific embodiments of this invention. It will be apparent, however, that variations and modifications may be made to the invention, with the attainment of some or all of the advantages of the invention. For example, it will be appreciated that the invention may be embodied in either hardware or software in a suitably programmed digital data processing system, both of which are readily accomplished by those of ordinary skill in the respective arts. Therefore, it is the object of the appended claims to cover all such variations and modifications as come within the true spirit and scope of the invention. 

I/We claim:
 1. A method of storing data on a photograph, the method comprising the steps of: delimiting a plurality of data block regions on the photograph, the plurality of data block regions superposing a region of the photograph delimited for the printing of a photographic image; compressing data representing the image contained in the photograph with a compression technique; redundantly encoding the compressed data using Reed-Solomon encoding techniques; shuffling the redundantly encoded compressed data in a deterministic manner to reduce potential effects of localized encoded data caused by damage to the photograph; and printing the shuffled data as dots within the data block regions on the photograph, wherein each of the plurality of data blocks is printed on a first side with a first column of orientation dots, and on a second side with a second column of orientation dots.
 2. The method of claim 1, wherein the data block regions include Reed-Solomon blocks and the step of shuffling the redundantly encoded compressed data spaces symbols from a single Reed-Solomon block at a suitable distance from one another.
 3. The method of claim 2, wherein a number of the Reed-Solomon blocks are reserved for control information, with remaining blocks used to store data.
 4. The method of claim 3, wherein each of the control blocks contains the same encoded information required for decoding the remaining data blocks.
 5. The method of claim 1, wherein the step of shuffling the encoded data in a deterministic manner includes placing all similar bytes from each Reed-Solomon block together.
 6. The method of claim 1, wherein the first column of orientation dots is printed with dots representing a logical ‘1’ bit, and the second column of orientation dots is printed with dots representing a logical ‘0’ bit. 